On distance between zeros of solutions of
third order differential equations
Annales Polonici Mathematici, Tome 77 (2001) no. 1, pp. 21-38
Voir la notice de l'article provenant de la source Institute of Mathematics Polish Academy of Sciences
The lower bounds of the spacings $b-a$ or $a'-a$ of two
consecutive zeros or three consecutive zeros of solutions of
third order differential equations of the form $$ y''' +
q(t)y'+p(t)y=0\tag*{$(*)$} $$ are derived under very general
assumptions on $p$ and $q$. These results are then used to show
that $t_{n+1}-t_n\to \infty $ or $t_{n+2}-t_n\to \infty $ as
$n\to \infty $ under suitable assumptions on $p$ and $q$, where
$\langle t_n\rangle$ is a sequence of
zeros of an oscillatory solution of $(*)$. The Opial-type
inequalities are used to derive lower bounds of the spacings
$d-a$ or $b-d$ for a solution $y(t)$ of $(*)$ with $y(a) = 0 =
y'(a)$, $y'(c) = 0$ and $y''(d) = 0$ where $d\in (a, c)$ or
$y'(c) = 0$, $y(b) = 0 = y'(b)$ and $y''(d) = 0$ where $d\in (c,
b)$.
Keywords:
lower bounds spacings b a a a consecutive zeros three consecutive zeros solutions third order differential equations form p tag* * derived under general assumptions these results t infty t infty infty under suitable assumptions where langle rangle sequence zeros oscillatory solution * opial type inequalities derive lower bounds spacings d a b d solution * where where
Affiliations des auteurs :
N. Parhi 1 ; S. Panigrahi 1
@article{10_4064_ap77_1_3,
author = {N. Parhi and S. Panigrahi},
title = {On distance between zeros of solutions of
third order differential equations},
journal = {Annales Polonici Mathematici},
pages = {21--38},
publisher = {mathdoc},
volume = {77},
number = {1},
year = {2001},
doi = {10.4064/ap77-1-3},
language = {en},
url = {http://geodesic.mathdoc.fr/articles/10.4064/ap77-1-3/}
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N. Parhi; S. Panigrahi. On distance between zeros of solutions of third order differential equations. Annales Polonici Mathematici, Tome 77 (2001) no. 1, pp. 21-38. doi: 10.4064/ap77-1-3
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